You can generalize the creation of the graph to an **arbitrary depth** and an **arbitrary number of children for each internal node**.

If you start numbering the levels from 0 -- that is the root node represents level 0 -- then each level contains n^{level} nodes.

n is the number of children on each internal node.

Therefore you can identify the indices of the first and last node on each level.

For instance in your case with n = 10 the last nodes for levels 0, 1, 2, 3 are

10^{0} = 1,

10^{0} + 10^{1} = 11,

10^{0} + 10^{1} + 10^{2} = 111,

10^{0} + 10^{1} + 10^{2} + 10^{3} = 1111.

To find the indices of the children for a given node you take the index of the last node on that level and add an offset.

If the given node is the first (leftmost) node on that level the offset is 0.

If its the last node on that level the offset is (n^{level} - 1) * n.

Then (n^{level} - 1) is the number of predecessor nodes on that level.

In general the offset is calculated as [number of predecessor nodes on that level] * n.

This notion is covered in the code as `offset = ulim + i * n + 1`

.

I have added `1`

to be able to loop in the following from `0 - (n-1)`

instead of from `1 - n`

.

```
import networkx as nx
n = 10 # the number of children for each node
depth = 3 # number of levels, starting from 0
G = nx.Graph()
G.add_node(1) # initialize root
ulim = 0
for level in range(depth): # loop over each level
nl = n**level # number of nodes on a given level
llim = ulim + 1 # index of first node on a given level
ulim = ulim + nl # index of last node on a given level
for i in range(nl): # loop over nodes (parents) on a given level
parent = llim + i
offset = ulim + i * n + 1 # index pointing to node just before first child
for j in range(n): # loop over children for a given node (parent)
child = offset + j
G.add_node(child)
G.add_edge(parent, child)
# show the results
print '{:d}-{:d}'.format(parent, child),
print ''
print '---------'
```

For `depth = 3`

and `n = 3`

this is the output:

```
1-2 1-3 1-4
---------
2-5 2-6 2-7
3-8 3-9 3-10
4-11 4-12 4-13
---------
5-14 5-15 5-16
6-17 6-18 6-19
7-20 7-21 7-22
8-23 8-24 8-25
9-26 9-27 9-28
10-29 10-30 10-31
11-32 11-33 11-34
12-35 12-36 12-37
13-38 13-39 13-40
---------
```